A Sharp Balian-Low Uncertainty Principle for Shift-Invariant Spaces

Abstract

A sharp version of the Balian-Low theorem is proven for the generators of finitely generated shift-invariant spaces. If generators \fk\k=1K ⊂ L2(Rd) are translated along a lattice to form a frame or Riesz basis for a shift-invariant space V, and if V has extra invariance by a suitable finer lattice, then one of the generators fk must satisfy ∫Rd |x| |fk(x)|2 dx = ∞, namely, fk H1/2(Rd). Similar results are proven for frames of translates that are not Riesz bases without the assumption of extra lattice invariance. The best previously existing results in the literature give a notably weaker conclusion using the Sobolev space Hd/2+ε(Rd); our results provide an absolutely sharp improvement with H1/2(Rd). Our results are sharp in the sense that H1/2(Rd) cannot be replaced by Hs(Rd) for any s<1/2.